Problem #PRU-109997

Problems Calculus Functions of one variable. Continuity Certain properties of a function and recurrence relations. Continuous functions (general properties)

Problem

On a function \(f (x)\) defined on the whole line of real numbers, it is known that for any \(a > 1\) the function \(f (x)\) + \(f (ax)\) is continuous on the whole line. Prove that \(f (x)\) is also continuous on the whole line.